Galois actions on torsion points of universal one-dimensional formal modules

Abstract

Let F be a local non-Archimedean field with ring of integers o. Let X be a one-dimensional formal o-module of F-height n over the algebraic closure of the residue field of o. By the work of Drinfeld, the universal deformation X of X is a formal group over a power series ring R0 in n-1 variables over the completion of the maximal unramified extension of o. For h ∈ \0,...,n-1\ let Uh be the subscheme of (R0) where the connected part of the associated divisible module of X has height h. Using the theory of Drinfeld level structures we show that the representation of the fundamental group of Uh on the Tate module of the etale quotient is surjective.